CCBC Essex School of Mathematics and Science MATH 163 College Algebra Section: EFA CLASSROOM LOCATION: L311 SEMESTER: Spring 2012 CLASS MEETING DAYS: MWF CLASS MEETING TIMES:12:20-1:15 INSTRUCTOR: D. TRUSZKOWSKI OFFICE LOCATION:C-113 EMAIL: dtruszkowski@ccbcmd.edu OFFICE HOURS:MWF 1:15-2:00 ; MW 9:30-10:00 DEPT./INSTRUCTOR PHONE:443-840-1528 WEBPAGE: http://faculty.ccbcmd.edu/~dtruszko/ DEPARTMENT CONTACT: Students should first attempt to take concerns to the faculty member. If students are unable to resolve course-related concerns with the instructor they should contact the Essex Math Coordinator, Sylvia Sorkin, at ssorkin@ccbcmd.edu. COURSE PRE-REQUISITES: Prerequisites: (Rdng 052 or LVR2) and (Engl 052 or LVE 2) or (ESOL 052 or LVE 2) and Algebra I and II in high school and a satisfactory score on the placement exam; or (Math 083 or LVM 3). COURSE DESCRIPTION Explores the nature and scope of college mathematics through the study of functions. Topics include the study of polynomial, rational, radical, piece-wise defined, and absolute value functions and their graphs and applications as well as modeling with these functions. Additional topics include complex numbers, the binomial theorem, inverse functions, operations with functions, exponential and logarithmic functions and their graphs and applications. REQUIREMENTS Three Chapter Exams: 300 points (100 points each) Quizzes/Project: 150 points (30 points each) There will be 6 quizzes given throughout the semester. The lowest grade is dropped. Homework: 45 points. Final Exam: 150 points (cumulative). GRADING POLICY 100%-90-% A 89%-80% B 79%-70% C 69% - 60% D Below 60% F MATERIALS : A scientific or graphing calculator is recommended and may be used in class for homework, quizzes, and exams. The TI-89, TI-92, and any other calculator with computer algebraic capabilities are not permitted in Math 163. I will be using a TI-84 Plus silver edition for some lectures. ATTENDANCE POLICY FOR THIS COURSE: You are expected to attend all scheduled classes. Should you miss a class, you are responsible for all work missed. Please be on time. Students with a legitimate problem about attendance should discuss the situation with their instructor. SPECIAL PROCEEDURES: IT IS IMPERATIVE THAT YOU DO NOT FALL BEHIND IN THIS COURSE. QUESTIONS ARE ENCOURAGED, AT ALL TIMES AND THE MORE THE BETTER.
NO MAKE-UP EXAMS EXCEPT UNDER UNUSUAL CIRCUMSTANCES. IF YOU MISS AN EXAM DUE TO AN EMERGENCY, YOU MUST NOTIFY ME BEFORE THE SCHEDULED EXAM, AND DOCUMENTAION MAY BE REQUIRED. ANY MAKE-UP EXAM MUST BE TAKEN BEFORE THE FIRST CLASS AFTER WHICH THE ACTUAL EXAM WAS GIVEN. IF THESE CONDITIONS ARE NOT MET, YOUR SCORE ON THE EXAM WILL BE A ZERO. TEXT(S): Algebra and Trigonometry Enhanced with Graphing Utilities Edition 5 Sullivan Hall, publisher Pearson/Prentice CALENDAR SPRING 2012 http://www.ccbcmd.edu/registration/academic_calendars.html FULL Term Last day to drop classes with 100% refund* Classes BEGIN Saturday classes begin Last day to drop classes with 50% refund* Mid-Terms (due by faculty) Spring Recess (College closed) No credit or continuing education (noncredit) classes scheduled College reopens, classes resume Last day to withdraw with "W" or change to audit status on transcript* Last day of classes for Spring semester Spring semester final examinations Final grades entered in SIMON by faculty by 4:30 p.m. Grades available to students in SIMON*** January 27, Friday January 30, Monday February 4, Saturday February 17, Friday March 19, Monday March 31 - April 9, Saturday - Monday April 10, Tuesday April 10, Tuesday May 12, Saturday May 13-19, Sunday - Saturday May 22, Tuesday May 29, Tuesday Last day to complete an I grade October 5, Friday * Submit your Drop/Add/Withdrawal form to the Records and Registration office by 7 p.m. when date is Monday through Thursday or by 4 p.m. when date is on Friday. CLASS FINAL EXAM DATE: FRIDAY 5/18 12:00-2:00 TENTATIVE LIST OF DATED ASSIGNMENTS Week Section Problems 1 1.1 (REVIEW) 71 77 odd, 79 89 odd (find the x and y intercepts only) 1.2 (REVIEW) 9 15 odd, 29, 31, 37, 39, 43, 57, 61, 65, 69 1.3 (REVIEW) 11, 15, 19, 23, 29, 31, 33, 35, 36, 39, 40, 45, 49, 53, 55, 63, 69, 73, 75, 77, 79 2 1.4 (REVIEW) 9, 11, 19, 21, 23, 27, 31, 53, 55, 57, 59, 63, 65 1.5 11, 12, 13, 15, 23, 27, 35, 43, 49, 67-75 odd, 83
3 1.6 7-15odd, 21-27 odd 1.7 11-15odd, 21-35odd, 43-85 eoo 2.1 21, 23, 29-41odd, 43-57 odd 4 3.1 (REVIEW) 15-23 odd, 39, 41, 51, 55, 57, 61, 65 6.1 29-41 odd 3.2 9-23 odd 3.3 11-27 odd, 33, 35, 53, 55 5 2.2 (REVIEW) 11, 15, 23, 27, 29, 37, 45, 49, 59, 67, 71, 79 6 Test 1 4.1 37, 47 4.2 17, 19, 21, 22 4.3 11-18, 29-35 odd, 43, 45, 49, 83 7 3.4 9-16, 25-31 odd, 47 3.5 7-19, 21-29 odd, 35-57 odd, 69, 71 5.1 11-25odd, 35-55 odd, 65-85 eoo (steps 1-3 only) 13.5 17-33odd 8 R.4 89, 93, 97 R.6 5-19 odd 5.5 11-31 odd, 39-45 odd 9 5.6 7-27odd, 31, 33 Test 2 10 5.2 11-23odd, 41-51 odd 5.3 7-25odd 5.4 19-43 odd, 49-59 odd 11 6.2 9-51 odd 6.3 11-19 odd, 29-36, 95, 97, 99 6.4 9-45 odd, 83, 85, 117, 119 12 6.5 7-11 odd, 17, 21 6.3 61, 63, 66, 77 6.4 87-105 odd 13 6.6 9, 35, 37, 49 14 6.8 1-11 odd Test 3 15 Review COURSE OBJECTIVES Upon successfully completing the course students will be able to: 1. Produce and compare graphs of absolute value and piecewise-defined functions; 2. Solve inequalities in one and two variables; 3. Solve absolute value inequalities in one variable; 4. Identify domain and range of functions;
5. Produce and compare graphs of functions, using translations, symmetry, end behavior, and asymptotes; 6. Combine two or more functions using addition, subtraction, multiplication, division, or functional composition; 7. Identify the inverse of a given function; 8. Identify the function, given information about the function; 9. Model numerical data using quadratic functions to further analyze data and predict values; 10. Perform operations with functions; 11. Produce and compare graphs of exponential and logarithmic functions; 12. Solve problems using exponential and logarithmic functions; 13. Produce and compare graphs of polynomial functions; 14. Identify the zeros of polynomial functions; apply the Fundamental Theorem of Algebra; 15. Identify the equation of a polynomial using the Theory of Equations and given sufficient information about its zeroes; 16. Apply the Binomial Theorem to determine the coefficients of a polynomial; 17. Solve rational equations; 18. Produce graphs of rational functions; 19. Construct a solution to real world problems using problem methods individually and in groups; 20. Examine the mathematical contributions made by people from diverse cultures throughout history. (V, 5) 21. Articulate a solution to mathematical problems; and 22. Apply appropriate technology to the solution of mathematical problems. MAJOR TOPICS I. Absolute value equations and inequalities a. Absolute value equations b. Absolute value inequalities II. Functions c. Review domain, range, functional notation d. Modeling data with linear regression function e. Review quadratic functions and their graphs f. Graphing techniques using shifting/stretching techniques g. Absolute value and piecewise defined functions and their graphs III. Polynomial Functions h. Graphs of polynomial functions i. Zeros of polynomial functions j. Complex numbers and theory of equations k. Fundamental Theorem of Algebra l. Modeling with polynomial functions IV. Binomial Theorem m. Expanding a binomial n. Finding a term in a binomial expansion V. Rational Functions and Radical Functions o. Graphs of rational functions p. Graphs of radical functions q. Equations and inequalities of rational and radical functions VI. Combinations of Functions r. Arithmetic operations on functions
s. Composition of functions t. One-to-one functions u. Inverse functions VII. Exponential and Logarithmic Functions v. Definition and graphs of exponential functions w. Definition and graphs of logarithmic functions x. Properties of logarithms y. Solving exponential and logarithmic equations z. Applications of exponential and logarithmic functions RATIONALE College Algebra for Calculus is the first course in the Calculus track. The students will be introduced to the basics of linear and quadratic equations and inequalities, basic polynomial and rational functions, transcendental functions, systems of equations and basic matrix operations. This course is a pre-requisite for Pre-Calculus and will lay the ground work for the more intensive topics covered in that course. FOR ALL COLLEGE WIDE SYLLABUS POLICIES GO TO MyCCBC on the CCBC web page and view the SYLLABUS TAB.